Discrete uniformizing metrics on distributional limits of sphere packings

Abstract

Suppose that \Gn\ is a sequence of finite graphs such that each Gn is the tangency graph of a sphere packing in Rd. Let n be a uniformly random vertex of Gn and suppose that (G,) is the distributional limit of \(Gn,n)\ in the sense of Benjamini and Schramm. Then the conformal growth exponent of (G,) is at most d. In other words, there exists a unimodular "unit volume" weighting of the graph metric on (G,) such that the volume growth of balls in the weighted path metric is bounded by a polynomial of degree d. This generalizes to limits of graphs that can be "coarsely" packed in an Ahlfors d-regular metric measure space. Using our previous work, this implies that, under moment conditions on the degree of the root ,the almost sure spectral dimension of G is at most d. This fact was known previously only for graphs packed in R2 (planar graphs), and the case of d > 2 eluded approaches based on extremal length. In the process of bounding the spectral dimension, we establish that the spectral measure of (G,) is dominated by a variant of the d-dimensional Weyl law.